We set up a framework for computing the spectral dimension of a class of one-dimensional self-similar measures that are defined by iterated function systems with overlaps and satisfy a family of second-order self-similar identities. As applications of our result we obtain the spectral dimension of important measures such as the infinite Bernoulli convolution associated with the golden ratio and convolutions of Cantor-type measures. The main novelty of our result is that the iterated function systems we consider are not post-critically finite and do not satisfy the well-known open set condition
We report some results concerning spectral asymptotics of fractal Laplacians defined one-dimensional...
We study the distribution of eigenvalues of some Laplacians defined by fractal measures. We focus on...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...
We observe that some self-similar measures defined by finite or infinite iterated function systems with...
We observe that some self-similar measures defined by finite or infinite iterated function systems with...
AbstractUnder the assumption that a self-similar measure defined by a one-dimensional iterated funct...
The spectral dimension of the Laplacian defined by a measure has been shown to be closely related to ...
The spectral dimension of the Laplacian defined by a measure has been shown to be closely related to...
In this paper, we investigate the Hausdorff dimension of the invariant measures of the iterated func...
AbstractGiven a self-similar Dirichlet form on a self-similar set, we first give an estimate on the ...
We study spectral asymptotics of Laplacians defined by iterated function systems with overlaps in hi...
R. Kaufman and M. Tsujii proved that the Fourier transform of self-similar measures has a power deca...
Under the assumption that a self-similar measure defined by a one-dimensional iterated function syst...
AbstractIn this work we study the asymptotic distribution of eigenvalues in one-dimensional open set...
We study spectral asymptotics of a class of Laplacians defined by iterated function systems with over...
We report some results concerning spectral asymptotics of fractal Laplacians defined one-dimensional...
We study the distribution of eigenvalues of some Laplacians defined by fractal measures. We focus on...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...
We observe that some self-similar measures defined by finite or infinite iterated function systems with...
We observe that some self-similar measures defined by finite or infinite iterated function systems with...
AbstractUnder the assumption that a self-similar measure defined by a one-dimensional iterated funct...
The spectral dimension of the Laplacian defined by a measure has been shown to be closely related to ...
The spectral dimension of the Laplacian defined by a measure has been shown to be closely related to...
In this paper, we investigate the Hausdorff dimension of the invariant measures of the iterated func...
AbstractGiven a self-similar Dirichlet form on a self-similar set, we first give an estimate on the ...
We study spectral asymptotics of Laplacians defined by iterated function systems with overlaps in hi...
R. Kaufman and M. Tsujii proved that the Fourier transform of self-similar measures has a power deca...
Under the assumption that a self-similar measure defined by a one-dimensional iterated function syst...
AbstractIn this work we study the asymptotic distribution of eigenvalues in one-dimensional open set...
We study spectral asymptotics of a class of Laplacians defined by iterated function systems with over...
We report some results concerning spectral asymptotics of fractal Laplacians defined one-dimensional...
We study the distribution of eigenvalues of some Laplacians defined by fractal measures. We focus on...
Self-similar measures form a fundamental class of fractal measures, and is much less understood if t...